Abstract
We derive bounds on the Kolmogorov distance between the dis- tribution of a random functional of a {0, 1}-valued random sequence and the normal distribution. Our approach, which relies on the general framework of stochastic analysis for discrete-time normal martingales, extends existing results obtained for independent Bernoulli (or Rademacher) sequences. In particular, we obtain Kolmogorov distance bounds for the sum of normalized random sequences without any independence assumption.
Anno
2023
Autori IAC
Tipo pubblicazione
Altri Autori
Ian Flint
Nicolas Privault
Giovanni Luca Torrisi
Nicolas Privault
Giovanni Luca Torrisi
Editore
Serials Publications
Rivista
Communications on stochastic analysis
